Chris Marshall >
PDL >
PDL::Complex

PDL::Complex - handle complex numbers

use PDL; use PDL::Complex;

This module features a growing number of functions manipulating complex numbers. These are usually represented as a pair `[ real imag ]`

or `[ angle phase ]`

. If not explicitly mentioned, the functions can work inplace (not yet implemented!!!) and require rectangular form.

While there is a procedural interface available (`$a/$b*$c <=> Cmul (Cdiv $a, $b), $c)`

), you can also opt to cast your pdl's into the `PDL::Complex`

datatype, which works just like your normal piddles, but with all the normal perl operators overloaded.

The latter means that `sin($a) + $b/$c`

will be evaluated using the normal rules of complex numbers, while other pdl functions (like `max`

) just treat the piddle as a real-valued piddle with a lowest dimension of size 2, so `max`

will return the maximum of all real and imaginary parts, not the "highest" (for some definition)

`i`

is a constant exported by this module, which represents`-1**0.5`

, i.e. the imaginary unit. it can be used to quickly and conviniently write complex constants like this:`4+3*i`

.- Use
`r2C(real-values)`

to convert from real to complex, as in`$r = Cpow $cplx, r2C 2`

. The overloaded operators automatically do that for you, all the other functions, do not. So`Croots 1, 5`

will return all the fifths roots of 1+1*i (due to threading). - use
`cplx(real-valued-piddle)`

to cast from normal piddles into the complex datatype. Use`real(complex-valued-piddle)`

to cast back. This requires a copy, though. - This module has received some testing by Vanuxem Grégory (g.vanuxem at wanadoo dot fr). Please report any other errors you come across!

The complex constant five is equal to `pdl(1,0)`

:

pdl> p $x = r2C 5 5 +0i

Now calculate the three cubic roots of of five:

pdl> p $r = Croots $x, 3 [1.70998 +0i -0.854988 +1.48088i -0.854988 -1.48088i]

Check that these really are the roots:

pdl> p $r ** 3 [5 +0i 5 -1.22465e-15i 5 -7.65714e-15i]

Duh! Could be better. Now try by multiplying `$r`

three times with itself:

pdl> p $r*$r*$r [5 +0i 5 -4.72647e-15i 5 -7.53694e-15i]

Well... maybe `Cpow`

(which is used by the `**`

operator) isn't as bad as I thought. Now multiply by `i`

and negate, which is just a very expensive way of swapping real and imaginary parts.

pdl> p -($r*i) [0 -1.70998i 1.48088 +0.854988i -1.48088 +0.854988i]

Now plot the magnitude of (part of) the complex sine. First generate the coefficients:

pdl> $sin = i * zeroes(50)->xlinvals(2,4) + zeroes(50)->xlinvals(0,7)

Now plot the imaginary part, the real part and the magnitude of the sine into the same diagram:

pdl> use PDL::Graphics::Gnuplot pdl> gplot( with => 'lines', PDL::cat(im ( sin $sin ), re ( sin $sin ), abs( sin $sin ) ))

An ASCII version of this plot looks like this:

30 ++-----+------+------+------+------+------+------+------+------+-----++ + + + + + + + + + + + | $$| | $ | 25 ++ $$ ++ | *** | | ** *** | | $$* *| 20 ++ $** ++ | $$$* #| | $$$ * # | | $$ * # | 15 ++ $$$ * # ++ | $$$ ** # | | $$$$ * # | | $$$$ * # | 10 ++ $$$$$ * # ++ | $$$$$ * # | | $$$$$$$ * # | 5 ++ $$$############ * # ++ |*****$$$### ### * # | * #***** # * # | | ### *** ### ** # | 0 ## *** # * # ++ | * # * # | | *** # ** # | | * # * # | -5 ++ ** # * # ++ | *** ## ** # | | * #* # | | **** ***## # | -10 ++ **** # # ++ | # # | | ## ## | + + + + + + + ### + ### + + + -15 ++-----+------+------+------+------+------+-----###-----+------+-----++ 0 5 10 15 20 25 30 35 40 45 50

Cast a real-valued piddle to the complex datatype. The first dimension of the piddle must be of size 2. After this the usual (complex) arithmetic operators are applied to this pdl, rather than the normal elementwise pdl operators. Dataflow to the complex parent works. Use `sever`

on the result if you don't want this.

Cast a real-valued piddle to the complex datatype *without* dataflow and *inplace*. Achieved by merely reblessing a piddle. The first dimension of the piddle must be of size 2.

Cast a complex valued pdl back to the "normal" pdl datatype. Afterwards the normal elementwise pdl operators are used in operations. Dataflow to the real parent works. Use `sever`

on the result if you don't want this.

tan (a) = -i * (exp (a*i) - exp (-a*i)) / (exp (a*i) + exp (-a*i))

Return the complex `atan()`

.

Return the real or imaginary part of the complex number(s) given. These are slicing operators, so data flow works. The real and imaginary parts are returned as piddles (ref eq PDL).

Copyright (C) 2000 Marc Lehmann <pcg@goof.com>. All rights reserved. There is no warranty. You are allowed to redistribute this software / documentation as described in the file COPYING in the PDL distribution.

perl(1), PDL.

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